| // Copyright 2015-2021 The Khronos Group Inc. |
| // |
| // SPDX-License-Identifier: Apache-2.0 |
| |
| = Math Test |
| |
| This file (vkmath.txt) contains all the latexmath blocks and inlines in the |
| Vulkan spec and style guide, so we can see how they're rendered with |
| different methods and output formats. |
| |
| == File chapters/fundamentals.txt |
| |
| === latexmath block 1 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = { c \over { 2^b - 1 } } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 2 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = \max\left( {c \over {2^{b-1} - 1}}, -1.0 \right) |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| == File chapters/interfaces.txt |
| |
| === latexmath inline 1 |
| |
| latexmath:[(x,y,z,\frac{1}{w})] |
| |
| === latexmath inline 2 |
| |
| latexmath:[\frac{1}{w}] |
| |
| == File chapters/primsrast.txt |
| |
| === latexmath block 3 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| s = {1 \over 2} + { \left( x_p - x_f \right) \over \text{size} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| t = {1 \over 2} + { \left( y_p - y_f \right) \over \text{size} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 4 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| t = {{( \mathbf{p}_r - \mathbf{p}_a ) \cdot ( \mathbf{p}_b - \mathbf{p}_a )} |
| \over {\| \mathbf{p}_b - \mathbf{p}_a \|^2 }} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 5 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = {{ (1-t) {f_a / w_a} + t { f_b / w_b} } \over |
| {(1-t) / w_a + t / w_b }} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 6 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| a = -{1 \over 2}\sum_{i=0}^{n-1} |
| x_f^i y_f^{i \oplus 1} - |
| x_f^{i \oplus 1} y_f^i |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath inline 3 |
| |
| latexmath:[x_f^i] and latexmath:[y_f^i] |
| |
| === latexmath block 7 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| a = {{\mathrm{A}(p p_b p_c)} \over {\mathrm{A}(p_a p_b p_c)}}, \quad |
| b = {{\mathrm{A}(p p_a p_c)} \over {\mathrm{A}(p_a p_b p_c)}}, \quad |
| c = {{\mathrm{A}(p p_a p_b)} \over {\mathrm{A}(p_a p_b p_c)}}, |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 8 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = { a {f_a / w_a} + b {f_b / w_b} + c {f_c / w_c} } \over |
| { {a / w_a} + {b / w_b} + {c / w_c} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| == File chapters/fundamentals.txt |
| |
| === latexmath block 9 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = { c \over { 2^b - 1 } } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 10 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = \max\left( {c \over {2^{b-1} - 1}}, -1.0 \right) |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| == File chapters/interfaces.txt |
| |
| === latexmath inline 4 |
| |
| latexmath:[(x,y,z,\frac{1}{w})] |
| |
| === latexmath inline 5 |
| |
| latexmath:[\frac{1}{w}]. |
| |
| == File chapters/primsrast.txt |
| |
| === latexmath block 11 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| s = {1 \over 2} + { \left( x_p - x_f \right) \over \text{size} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| t = {1 \over 2} + { \left( y_p - y_f \right) \over \text{size} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 12 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| t = {{( \mathbf{p}_r - \mathbf{p}_a ) \cdot ( \mathbf{p}_b - \mathbf{p}_a )} |
| \over {\| \mathbf{p}_b - \mathbf{p}_a \|^2 }} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 13 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = {{ (1-t) {f_a / w_a} + t { f_b / w_b} } \over |
| {(1-t) / w_a + t / w_b }} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 14 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| a = -{1 \over 2}\sum_{i=0}^{n-1} |
| x_f^i y_f^{i \oplus 1} - |
| x_f^{i \oplus 1} y_f^i |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath inline 6 |
| |
| latexmath:[x_f^i] and latexmath:[y_f^i] |
| |
| === latexmath block 15 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| a = {{\mathrm{A}(p p_b p_c)} \over {\mathrm{A}(p_a p_b p_c)}}, \quad |
| b = {{\mathrm{A}(p p_a p_c)} \over {\mathrm{A}(p_a p_b p_c)}}, \quad |
| c = {{\mathrm{A}(p p_a p_b)} \over {\mathrm{A}(p_a p_b p_c)}}, |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 16 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = { a {f_a / w_a} + b {f_b / w_b} + c {f_c / w_c} } \over |
| { {a / w_a} + {b / w_b} + {c / w_c} } |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 17 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| f = \sum_{i=1}^{n} a_i f_i |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath inline 7 |
| |
| latexmath:[\sum_{i=1}^{n}a_i = 1]. |
| |
| === latexmath block 18 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| m = \sqrt{ \left({{\partial z_f} \over {\partial x_f}}\right)^2 |
| + \left({{\partial z_f} \over {\partial y_f}}\right)^2} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 19 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| m = \max\left( \left| {{\partial z_f} \over {\partial x_f}} \right|, |
| \left| {{\partial z_f} \over {\partial y_f}} \right| \right) |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 20 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| o = |
| \begin{cases} |
| m \times depthBiasSlopeFactor + |
| r \times depthBiasConstantFactor & depthBiasClamp = 0\ or\ NaN \\ |
| \min(m \times depthBiasSlopeFactor + |
| r \times depthBiasConstantFactor, |
| depthBiasClamp) & depthBiasClamp > 0 \\ |
| \max(m \times depthBiasSlopeFactor + |
| r \times depthBiasConstantFactor, |
| depthBiasClamp) & depthBiasClamp < 0 \\ |
| \end{cases} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| == File chapters/tessellation.txt |
| |
| === latexmath inline 8 |
| |
| latexmath:[\frac{1}{n}, \frac{2}{n}, \ldots, \frac{n-1}{n}] |
| |
| == File chapters/textures.txt |
| |
| === latexmath block 21 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| N & = 9 & \text{number of mantissa bits per component} \\ |
| B & = 15 & \text{exponent bias} \\ |
| E_{max} & = 31 & \text{maximum possible biased exponent value} \\ |
| sharedexp_{max} & = \frac{(2^N-1)}{2^N} \times 2^{(E_{max}-B)} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 22 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| exp' = |
| \begin{cases} |
| \left \lfloor \log_2(max_{clamped}) \right \rfloor + (B+1) |
| & \text{for}\ max_{clamped} > 2^{-(B+1)} \\ |
| 0 |
| & \text{for}\ max_{clamped} \leq 2^{-(B+1)} |
| \end{cases} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 23 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| max_{shared} = |
| \left \lfloor |
| \frac{max_{clamped}}{2^{(exp'-B-N)}}+\frac{1}{2} |
| \right \rfloor |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 24 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| exp_{shared} = |
| \begin{cases} |
| exp' & \text{for}\ 0 \leq max_{shared} < 2^N \\ |
| exp'+1 & \text{for}\ max_{shared} = 2^N |
| \end{cases} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 25 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| red_{shared} & = |
| \left \lfloor |
| \frac{red_{clamped}}{2^{(exp_{shared}-B-N)}}+ \frac{1}{2} |
| \right \rfloor \\ |
| green_{shared} & = |
| \left \lfloor |
| \frac{green_{clamped}}{2^{(exp_{shared}-B-N)}}+ \frac{1}{2} |
| \right \rfloor \\ |
| blue_{shared} & = |
| \left \lfloor |
| \frac{blue_{clamped}}{2^{(exp_{shared}-B-N)}}+ \frac{1}{2} |
| \right \rfloor |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 26 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| D & = 1.0 & |
| \begin{cases} |
| D_{ref} \leq D & \text{for LEQUAL} \\ |
| D_{ref} \geq D & \text{for GEQUAL} \\ |
| D_{ref} < D & \text{for LESS} \\ |
| D_{ref} > D & \text{for GREATER} \\ |
| D_{ref} = D & \text{for EQUAL} \\ |
| D_{ref} \neq D & \text{for NOTEQUAL} \\ |
| true & \text{for ALWAYS} \\ |
| false & \text{for NEVER} |
| \end{cases} \\ |
| D & = 0.0 & \text{otherwise} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 27 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| C'_{rgba}[R] & = |
| \begin{cases} |
| C_{rgba}[R] & \text{for RED swizzle} \\ |
| C_{rgba}[G] & \text{for GREEN swizzle} \\ |
| C_{rgba}[B] & \text{for BLUE swizzle} \\ |
| C_{rgba}[A] & \text{for ALPHA swizzle} \\ |
| 0 & \text{for ZERO swizzle} \\ |
| one & \text{for ONE swizzle} \\ |
| C_{rgba}[R] & \text{for IDENTITY swizzle} |
| \end{cases} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 28 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| C_{rgba}[R] & \text{is the RED component} \\ |
| C_{rgba}[G] & \text{is the GREEN component} \\ |
| C_{rgba}[B] & \text{is the BLUE component} \\ |
| C_{rgba}[A] & \text{is the ALPHA component} \\ |
| one & = 1.0\text{f} & \text{for floating point components} \\ |
| one & = 1 & \text{for integer components} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 29 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| dPdx_{i_1,j_0} & = dPdx_{i_0,j_0} & = P_{i_1,j_0} - P_{i_0,j_0} \\ |
| dPdx_{i_1,j_1} & = dPdx_{i_0,j_1} & = P_{i_1,j_1} - P_{i_0,j_1} \\ |
| \\ |
| dPdy_{i_0,j_1} & = dPdy_{i_0,j_0} & = P_{i_0,j_1} - P_{i_0,j_0} \\ |
| dPdy_{i_1,j_1} & = dPdy_{i_1,j_0} & = P_{i_1,j_1} - P_{i_1,j_0} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 30 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| dPdx & = |
| \begin{cases} |
| dPdx_{i_0,j_0} & \text{preferred}\\ |
| dPdx_{i_0,j_1} |
| \end{cases} \\ |
| dPdy & = |
| \begin{cases} |
| dPdy_{i_0,j_0} & \text{preferred}\\ |
| dPdy_{i_1,j_0} |
| \end{cases} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 31 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| s & = \frac{s}{q}, & \text{for 1D, 2D, or 3D image} \\ |
| \\ |
| t & = \frac{t}{q}, & \text{for 2D or 3D image} \\ |
| \\ |
| r & = \frac{r}{q}, & \text{for 3D image} \\ |
| \\ |
| D_{ref} & = \frac{D_{ref}}{q}, & \text{if provided} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| |
| === latexmath block 32 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| \partial{s}/\partial{x} & = dPdx(s), & \partial{s}/\partial{y} & = dPdy(s), & \text{for 1D, 2D, Cube, or 3D image} \\ |
| \partial{t}/\partial{x} & = dPdx(t), & \partial{t}/\partial{y} & = dPdy(t), & \text{for 2D, Cube, or 3D image} \\ |
| \partial{u}/\partial{x} & = dPdx(u), & \partial{u}/\partial{y} & = dPdy(u), & \text{for Cube or 3D image} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 33 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| s_{face} & = |
| \frac{1}{2} \times \frac{s_c}{|r_c|} + \frac{1}{2} \\ |
| t_{face} & = |
| \frac{1}{2} \times \frac{t_c}{|r_c|} + \frac{1}{2} \\ |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 34 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \frac{\partial{s_{face}}}{\partial{x}} &= |
| \frac{\partial}{\partial{x}} \left ( \frac{1}{2} \times \frac{s_{c}}{|r_{c}|} |
| + \frac{1}{2}\right ) \\ |
| \frac{\partial{s_{face}}}{\partial{x}} &= |
| \frac{1}{2} \times \frac{\partial}{\partial{x}} |
| \left ( \frac{s_{c}}{|r_{c}|} \right ) \\ |
| \frac{\partial{s_{face}}}{\partial{x}} &= |
| \frac{1}{2} \times |
| \left ( |
| \frac{ |
| |r_{c}| \times \partial{s_c}/\partial{x} |
| -s_c \times {\partial{r_{c}}}/{\partial{x}}} |
| {\left ( r_{c} \right )^2} |
| \right ) |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 35 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \frac{\partial{s_{face}}}{\partial{y}} &= |
| \frac{1}{2} \times |
| \left ( |
| \frac{ |
| |r_{c}| \times \partial{s_c}/\partial{y} |
| -s_c \times {\partial{r_{c}}}/{\partial{y}}} |
| {\left ( r_{c} \right )^2} |
| \right )\\ |
| \frac{\partial{t_{face}}}{\partial{x}} &= |
| \frac{1}{2} \times |
| \left ( |
| \frac{ |
| |r_{c}| \times \partial{t_c}/\partial{x} |
| -t_c \times {\partial{r_{c}}}/{\partial{x}}} |
| {\left ( r_{c} \right )^2} |
| \right ) \\ |
| \frac{\partial{t_{face}}}{\partial{y}} &= |
| \frac{1}{2} \times |
| \left ( |
| \frac{ |
| |r_{c}| \times \partial{t_c}/\partial{y} |
| -t_c \times {\partial{r_{c}}}/{\partial{y}}} |
| {\left ( r_{c} \right )^2} |
| \right ) |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 36 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \rho_{x} & = \sqrt{ m_{ux} ^{2} + m_{vx} ^{2} + m_{wx} ^{2} } \\ |
| \rho_{y} & = \sqrt{ m_{uy} ^{2} + m_{vy} ^{2} + m_{wy} ^{2} } |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 37 |
| |
| {empty}:: [eq]#f~x~# is continuous and monotonically increasing in each of |
| [eq]#m~ux~#, [eq]#m~vx~#, and [eq]#m~wx~# |
| {empty}:: [eq]#f~y~# is continuous and monotonically increasing in each of |
| [eq]#m~uy~#, [eq]#m~vy~#, and [eq]#m~wy~# |
| {empty}:: [eq]#max({vert}m~ux~{vert}, {vert}m~vx~{vert}, |
| {vert}m~wx~{vert}) {leq} f~x~ {leq} {vert}m~ux~{vert} {plus} |
| {vert}m~vx~{vert} {plus} {vert}m~wx~{vert}# |
| {empty}:: [eq]#max({vert}m~uy~{vert}, {vert}m~vy~{vert}, |
| {vert}m~wy~{vert}) {leq} f~y~ {leq} {vert}m~uy~{vert} {plus} |
| {vert}m~vy~{vert} {plus} {vert}m~wy~{vert}# |
| |
| === latexmath block 38 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| N & = \min \left (\left \lceil \frac{\rho_{max}}{\rho_{min}} \right \rceil ,max_{Aniso} \right ) |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 39 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \lambda_{base}(x,y) & = |
| \begin{cases} |
| shaderOp.Lod & \text{(from optional SPIR-V operand)} \\ |
| \log_2 \left ( \frac{\rho_{max}}{N} \right ) & \text{otherwise} |
| \end{cases} \\ |
| \lambda'(x,y) & = \lambda_{base} + \mathbin{clamp}(sampler.bias + shaderOp.bias,-maxSamplerLodBias,maxSamplerLodBias) \\ |
| \lambda & = |
| \begin{cases} |
| lod_{max}, & \lambda' > lod_{max} \\ |
| \lambda', & lod_{min} \leq \lambda' \leq lod_{max} \\ |
| lod_{min}, & \lambda' < lod_{min} \\ |
| undefined, & lod_{min} > lod_{max} \\ |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 40 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| sampler.bias & = mipLodBias & \text{(from sampler descriptor)} \\ |
| shaderOp.bias & = |
| \begin{cases} |
| Bias & \text{(from optional SPIR-V operand)} \\ |
| 0 & \text{otherwise} |
| \end{cases} \\ |
| sampler.lod_{min} & = minLod & \text{(from sampler descriptor)} \\ |
| shaderOp.lod_{min} & = |
| \begin{cases} |
| MinLod & \text{(from optional SPIR-V operand)} \\ |
| 0 & \text{otherwise} |
| \end{cases} \\ |
| \\ |
| lod_{min} & = \max(sampler.lod_{min}, shaderOp.lod_{min}) \\ |
| lod_{max} & = maxLod & \text{(from sampler descriptor)} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 41 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| d = |
| \begin{cases} |
| level_{base}, & \lambda \leq \frac{1}{2} \\[.5em] |
| nearest(\lambda), & \lambda > \frac{1}{2}, |
| level_{base} + \lambda \leq |
| q + \frac{1}{2} \\[.5em] |
| q, & \lambda > \frac{1}{2}, |
| level_{base} + \lambda > q + \frac{1}{2} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 42 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| nearest(\lambda) & = |
| \begin{cases} |
| \left \lceil level_{base}+\lambda + \frac{1}{2}\right \rceil - 1, & |
| \text{preferred} \\ |
| \left \lfloor level_{base}+\lambda + \frac{1}{2}\right \rfloor, & |
| \text{alternative} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 43 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| d_{hi} & = |
| \begin{cases} |
| q, & level_{base} + \lambda \geq q \\ |
| \left \lfloor level_{base}+\lambda \right \rfloor, & \text{otherwise} |
| \end{cases} \\ |
| d_{lo} & = |
| \begin{cases} |
| q, & level_{base} + \lambda \geq q \\ |
| d_{hi}+1, & \text{otherwise} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 44 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| u(x,y) & = s(x,y) \times width_{level} \\ |
| v(x,y) & = |
| \begin{cases} |
| 0 & \text{for 1D images} \\ |
| t(x,y) \times height_{level} & \text{otherwise} |
| \end{cases} \\ |
| w(x,y) & = |
| \begin{cases} |
| 0 & \text{for 2D or Cube images} \\ |
| r(x,y) \times depth_{level} & \text{otherwise} |
| \end{cases} \\ |
| \\ |
| a(x,y) & = |
| \begin{cases} |
| a(x,y) & \text{for array images} \\ |
| 0 & \text{otherwise} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 45 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \mathbin{RNE}(a) & = |
| \begin{cases} |
| \mathbin{roundTiesToEven}(a) & \text{preferred, from IEEE Std 754-2008 Floating-Point Arithmetic} \\ |
| \left \lfloor a + \frac{1}{2} \right \rfloor & \text{alternative} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 46 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| i &= |
| \begin{cases} |
| i \bmod size & \text{for repeat} \\ |
| (size-1) - \mathbin{mirror} |
| ((i \bmod (2 \times size)) - size) & \text{for mirrored repeat} \\ |
| \mathbin{clamp}(i,0,size-1) & \text{for clamp to edge} \\ |
| \mathbin{clamp}(i,-1,size) & \text{for clamp to border} \\ |
| \mathbin{clamp}(\mathbin{mirror}(i),0,size-1) & \text{for mirror clamp to edge} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| |
| === latexmath block 47 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| & \mathbin{mirror}(n) = |
| \begin{cases} |
| n & \text{for}\ n \geq 0 \\ |
| -(1+n) & \text{otherwise} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 48 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau[R] &= \tau_{i0j1}[level_{base}][comp] \\ |
| \tau[G] &= \tau_{i1j1}[level_{base}][comp] \\ |
| \tau[B] &= \tau_{i1j0}[level_{base}][comp] \\ |
| \tau[A] &= \tau_{i0j0}[level_{base}][comp] |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 49 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau[level_{base}][comp] &= |
| \begin{cases} |
| \tau[level_{base}][R], & \text{for}\ comp = 0 \\ |
| \tau[level_{base}][G], & \text{for}\ comp = 1 \\ |
| \tau[level_{base}][B], & \text{for}\ comp = 2 \\ |
| \tau[level_{base}][A], & \text{for}\ comp = 3 |
| \end{cases}\\ |
| comp & \,\text{from SPIR-V operand Component} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 50 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau[level] &= |
| \begin{cases} |
| \tau_{ijk}[level], & \text{for 3D image} \\ |
| \tau_{ij}[level], & \text{for 2D or Cube image} \\ |
| \tau_{i}[level], & \text{for 1D image} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 51 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau_{3D}[level] & = (1-\alpha)(1-\beta)(1-\gamma)\tau_{i0j0k0}[level] \\ |
| & \, + (\alpha)(1-\beta)(1-\gamma)\tau_{i1j0k0}[level] \\ |
| & \, + (1-\alpha)(\beta)(1-\gamma)\tau_{i0j1k0}[level] \\ |
| & \, + (\alpha)(\beta)(1-\gamma)\tau_{i1j1k0}[level] \\ |
| & \, + (1-\alpha)(1-\beta)(\gamma)\tau_{i0j0k1}[level] \\ |
| & \, + (\alpha)(1-\beta)(\gamma)\tau_{i1j0k1}[level] \\ |
| & \, + (1-\alpha)(\beta)(\gamma)\tau_{i0j1k1}[level] \\ |
| & \, + (\alpha)(\beta)(\gamma)\tau_{i1j1k1}[level] |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 52 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau_{2D}[level] & = (1-\alpha)(1-\beta)\tau_{i0j0}[level] \\ |
| & \, + (\alpha)(1-\beta)\tau_{i1j0}[level] \\ |
| & \, + (1-\alpha)(\beta)\tau_{i0j1}[level] \\ |
| & \, + (\alpha)(\beta)\tau_{i1j1}[level] |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 53 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau_{1D}[level] & = (1-\alpha)\tau_{i0}[level] \\ |
| & \, + (\alpha)\tau_{i1}[level] |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 54 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau[level] &= |
| \begin{cases} |
| \tau_{3D}[level], & \text{for 3D image} \\ |
| \tau_{2D}[level], & \text{for 2D or Cube image} \\ |
| \tau_{1D}[level], & \text{for 1D image} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 55 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau &= |
| \begin{cases} |
| \tau[d], & \text{for mip mode BASE or NEAREST} \\ |
| (1-\delta)\tau[d_{hi}]+\delta\tau[d_{lo}], & \text{for mip mode LINEAR} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 56 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau_{2Daniso} & = |
| \frac{1}{N}\sum_{i=1}^{N} |
| {\tau_{2D}\left ( |
| u \left ( x - \frac{1}{2} + \frac{i}{N+1} , y \right ), |
| \left ( v \left (x-\frac{1}{2}+\frac{i}{N+1} \right ), y |
| \right ) |
| \right )}, |
| & \text{when}\ \rho_{x} > \rho_{y} \\ |
| \tau_{2Daniso} &= |
| \frac{1}{N}\sum_{i=1}^{N} |
| {\tau_{2D}\left ( |
| u \left ( x, y - \frac{1}{2} + \frac{i}{N+1} \right ), |
| \left ( v \left (x,y-\frac{1}{2}+\frac{i}{N+1} \right ) |
| \right ) |
| \right )}, |
| & \text{when}\ \rho_{y} \geq \rho_{x} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| == File chapters/vertexpostproc.txt |
| |
| === latexmath block 57 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| \begin{array}{c} |
| -w_c \leq x_c \leq w_c \\ |
| -w_c \leq y_c \leq w_c \\ |
| 0 \leq z_c \leq w_c |
| \end{array} |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 58 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| \left(\begin{array}{c} |
| x_c \\ |
| y_c \\ |
| z_c \\ |
| w_c |
| \end{array}\right) |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath block 59 |
| |
| [latexmath] |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| \left( |
| \begin{array}{c} |
| x_d \\ |
| y_d \\ |
| z_d |
| \end{array} |
| \right) = |
| \left( |
| \begin{array}{c} |
| \frac{x_c}{w_c} \\ |
| \frac{y_c}{w_c} \\ |
| \frac{z_c}{w_c} |
| \end{array} |
| \right) |
| ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ |
| |
| === latexmath inline 12 |
| |
| latexmath:[\frac{k}{2^m - 1}] |
| |
| == File chapters/VK_IMG_filter_cubic/filter_cubic_texel_filtering.txt |
| |
| === latexmath block 60 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| cinterp(\tau_0, \tau_1, \tau_2, \tau_3, \omega) = |
| \frac{1}{2} |
| \begin{bmatrix}1 & \omega & \omega^2 & \omega^3 \end{bmatrix} |
| \times |
| \begin{bmatrix} |
| 0 & 2 & 0 & 0 \\ |
| -1 & 0 & 1 & 0 \\ |
| 2 & -5 & 4 & 1 \\ |
| -1 & 3 & -3 & 1 |
| \end{bmatrix} |
| \times |
| \begin{bmatrix} |
| \tau_0 \\ |
| \tau_1 \\ |
| \tau_2 \\ |
| \tau_3 |
| \end{bmatrix} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| === latexmath block 61 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| \tau[level] &= |
| \begin{cases} |
| \tau_{2D}[level], & \text{for 2D image} \\ |
| \tau_{1D}[level], & \text{for 1D image} |
| \end{cases} |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| == File chapters/VK_IMG_filter_cubic/filter_cubic_texel_selection.txt |
| |
| === latexmath block 62 |
| |
| [latexmath] |
| ++++++++++++++++++++++++ |
| \begin{aligned} |
| i_{0} & = \left \lfloor u - \frac{3}{2} \right \rfloor & i_{1} & = i_{0} + 1 & i_{2} & = i_{1} + 1 & i_{3} & = i_{2} + 1 \\[1em] |
| j_{0} & = \left \lfloor u - \frac{3}{2} \right \rfloor & j_{1} & = j_{0} + 1 & j_{2} & = j_{1} + 1 & j_{3} & = j_{2} + 1 \\ |
| \\ |
| \alpha & = \mathbin{frac} \left ( u - \frac{1}{2} \right ) \\[1em] |
| \beta & = \mathbin{frac} \left ( v - \frac{1}{2} \right ) |
| \end{aligned} |
| ++++++++++++++++++++++++ |
| |
| == File style/writing.txt |
| |
| === latexmath inline 13 |
| |
| latexmath:[[0,1\]] |
| |
| === latexmath inline 14 |
| |
| latexmath:[\frac{1 - \frac{x}{2}}{x - 1}] |
| |
| === latexmath inline 15 |
| |
| latexmath:[\mathbf{c} = t \mathbf{c}_1 + (1-t) \mathbf{c}_2.] |
| |
| === latexmath block 63 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| \begin{aligned} |
| c_{RGB} & = |
| \begin{cases} |
| \frac{c_{sRGB}}{12.92} & \text{for}\ c_{sRGB} \leq 0.04045 \\ |
| \left ( \frac{c_{sRGB}+0.055}{1.055} \right )^{2.4} & \text{for}\ c_{sRGB} > 0.04045 |
| \end{cases} |
| \end{aligned} |
| +++++++++++++++++++ |
| |
| === latexmath block 64 |
| |
| [latexmath] |
| +++++++++++++++++++ |
| V = |
| \begin{cases} |
| (-1)^S \times 0.0, & E = 0, M = 0 \\ |
| (-1)^S \times 2^{-14} \times { M \over 2^{10} }, |
| & E = 0, M \neq 0 \\ |
| (-1)^S \times 2^{E-15} \times { \left( 1 + { M \over 2^{10} } \right) }, |
| & 0 < E < 31 \\ |
| (-1)^S \times Inf, & E = 31, M = 0 \\ |
| NaN, & E = 31, M \neq 0 |
| \end{cases} |
| +++++++++++++++++++ |
