Department of Mathematics, University of Utah, Salt Lake City, UT 84112, USA
Mini Review
Understanding the Solvability Criterion for Systems Arising from Monge?Ampère Equations
Author(s): Jane Swoboda*
The Monge–Ampère equation, stemming from classical geometry, has found significant applications across various fields, including differential
geometry, optimal transportation and even image processing. The solvability criterion for systems arising from Monge–Ampère equations plays a
pivotal role in understanding the existence and uniqueness of solutions to these equations. In this article, we delve into the mathematical intricacies
of this criterion, exploring its theoretical foundations and practical implications. We begin by providing an overview of the Monge–Ampère equation
and its significance. Subsequently, we delve into the formulation of systems derived from this equation and elucidate the solvability criterion,
discussing its mathematical underpinnings and implications in diverse contexts. Through concrete examples and.. Read More»
DOI:
10.37421/2090-0902.2024.15.465
Physical Mathematics received 686 citations as per Google Scholar report
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