[go: up one dir, main page]

In the theory of partial differential equations, an a priori estimate (also called an apriori estimate or a priori bound) is an estimate for the size of a solution or its derivatives of a partial differential equation. A priori is Latin for "from before" and refers to the fact that the estimate for the solution is derived before the solution is known to exist. One reason for their importance is that if one can prove an a priori estimate for solutions of a differential equation, then it is often possible to prove that solutions exist using the continuity method or a fixed point theorem.

A priori estimates were introduced and named by Sergei Natanovich Bernstein (1906, 1910), who used them to prove existence of solutions to second order nonlinear elliptic equations in the plane. Some other early influential examples of a priori estimates include the Schauder estimates given by Schauder (1934, 1937), and the estimates given by De Giorgi and Nash for second order elliptic or parabolic equations in many variables, in their respective solutions to Hilbert's nineteenth problem.

References

edit
  • Bernstein, Serge (1906), "Sur la généralisation du problème de Dirichlet. Première partie", Mathematische Annalen, 62, Springer Berlin / Heidelberg: 253–271, doi:10.1007/BF01449980, ISSN 0025-5831, JFM 37.0383.01, S2CID 123423034
  • Bernstein, Serge (1910), "Sur la généralisation du problème de Dirichlet. Deuxième partie", Mathematische Annalen, 69, Springer Berlin / Heidelberg: 82–136, doi:10.1007/BF01455154, ISSN 0025-5831, JFM 41.0427.02, S2CID 117210948
  • Brezis, Haïm; Browder, Felix (1998), "Partial differential equations in the 20th century", Advances in Mathematics, 135 (1): 76–144, doi:10.1006/aima.1997.1713, ISSN 0001-8708, MR 1617413
  • Evans, Lawrence C. (2010) [1998], Partial differential equations, Graduate Studies in Mathematics, vol. 19 (2nd ed.), Providence, R.I.: American Mathematical Society, ISBN 978-0-8218-4974-3, MR 2597943
  • Schauder, Juliusz (1934), "Über lineare elliptische Differentialgleichungen zweiter Ordnung", Mathematische Zeitschrift (in German), vol. 38, no. 1, Berlin, Germany: Springer-Verlag, pp. 257–282, doi:10.1007/BF01170635, MR 1545448, S2CID 120461752
  • Schauder, Juliusz (1937), "Numerische Abschätzungen in elliptischen linearen Differentialgleichungen" (PDF), Studia Mathematica (in German), vol. 5, Lwów, Poland: Polska Akademia Nauk. Instytut Matematyczny, pp. 34–42