Phase-field models on graphs

Phase-field models on graphs are a discrete analogue to phase-field models, defined on a graph. They are used in image analysis (for feature identification) and for the segmentation of social networks.

Graph Ginzburg–Landau functional

For a graph with vertices V and edge weights $ω_{i, j}$ , the graph Ginzburg–Landau functional of a map $u : V \to ℝ$ is given by

F_{ε} (u) = \frac{ε}{2} \sum_{i, j \in V} ω_{i j} (u_{i} - u_{j})^{2} + \frac{1}{ε} \sum_{i \in V} W (u_{i}),

where W is a double well potential, for example the quartic potential W(x) = x²(1 − x²). The graph Ginzburg–Landau functional was introduced by Bertozzi and Flenner.^[1] In analogy to continuum phase-field models, where regions with u close to 0 or 1 are models for two phases of the material, vertices can be classified into those with u_j close to 0 or close to 1, and for small $ε$ , minimisers of $F_{ε}$ will satisfy that u_j is close to 0 or 1 for most nodes, splitting the nodes into two classes.

Graph Allen–Cahn equation

To effectively minimise $F_{ε}$ , a natural approach is by gradient flow (steepest descent). This means to introduce an artificial time parameter and to solve the graph version of the Allen–Cahn equation,

\frac{d}{d t} u_{j} = - ε (Δ u)_{j} - \frac{1}{ε} W^{'} (u_{j}),

where $Δ$ is the graph Laplacian. The ordinary continuum Allen–Cahn equation and the graph Allen–Cahn equation are natural counterparts, just replacing ordinary calculus by calculus on graphs. A convergence result for a numerical graph Allen–Cahn scheme has been established by Luo and Bertozzi.^[2] It is also possible to adapt other computational schemes for mean curvature flow, for example schemes involving thresholding like the Merriman–Bence–Osher scheme, to a graph setting, with analogous results.^[3]

References

↑ Bertozzi, A.; Flenner, A. (2012-01-01). "Diffuse Interface Models on Graphs for Classification of High Dimensional Data". Multiscale Modeling & Simulation. 10 (3): 1090–1118. CiteSeerX 10.1.1.299.4261. doi:10.1137/11083109X. ISSN 1540-3459.
↑ Luo, Xiyang; Bertozzi, Andrea L. (2017-05-01). "Convergence of the Graph Allen–Cahn Scheme". Journal of Statistical Physics. 167 (3): 934–958. Bibcode:2017JSP...167..934L. doi:10.1007/s10955-017-1772-4. ISSN 1572-9613.
↑ van Gennip, Yves. Graph Ginzburg–Landau: discrete dynamics, continuum limits, and applications. An overview. In Ei, S.-I.; Giga, Y.; Hamamuki, N.; Jimbo, S.; Kubo, H.; Kuroda, H.; Ozawa, T.; Sakajo, T.; Tsutaya, K. (2019-07-30). "Proceedings of 44th Sapporo Symposium on Partial Differential Equations". Hokkaido University Technical Report Series in Mathematics. 177: 89–102. doi:10.14943/89899.

[BF12-1] Bertozzi, A.; Flenner, A. (2012-01-01). "Diffuse Interface Models on Graphs for Classification of High Dimensional Data". Multiscale Modeling & Simulation. 10 (3): 1090–1118. CiteSeerX 10.1.1.299.4261. doi:10.1137/11083109X. ISSN 1540-3459.

[2] Luo, Xiyang; Bertozzi, Andrea L. (2017-05-01). "Convergence of the Graph Allen–Cahn Scheme". Journal of Statistical Physics. 167 (3): 934–958. Bibcode:2017JSP...167..934L. doi:10.1007/s10955-017-1772-4. ISSN 1572-9613.

[3] van Gennip, Yves. Graph Ginzburg–Landau: discrete dynamics, continuum limits, and applications. An overview. In Ei, S.-I.; Giga, Y.; Hamamuki, N.; Jimbo, S.; Kubo, H.; Kuroda, H.; Ozawa, T.; Sakajo, T.; Tsutaya, K. (2019-07-30). "Proceedings of 44th Sapporo Symposium on Partial Differential Equations". Hokkaido University Technical Report Series in Mathematics. 177: 89–102. doi:10.14943/89899.

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Phase-field models on graphs

Contents

Graph Ginzburg–Landau functional

Graph Allen–Cahn equation

See also

References

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