A way to solve a system of equations by keeping track of the solutions of other systems of equations. See link for a more in depth answer.
Homotopy to Marie was created in 1982.
Mark Hovey has written: 'Model categories' -- subject(s): Model categories (Mathematics), Complexes, Homotopy theory 'Axiomatic stable homotopy theory' -- subject(s): Homotopy theory
J. Frank Adams has written: 'Stable homotopy theory' -- subject(s): Homotopy theory
Klaus Johannson has written: 'Homotopy equivalences of 3-manifolds with boundaries' -- subject(s): Homotopy equivalences, Manifolds (Mathematics)
Richard M. Hain has written: 'Iterated integrals and homotopy periods' -- subject(s): Homotopy theory, Multiple integrals
Myles Tierney has written: 'Categorical constructions in stable homotopy theory' -- subject(s): Categories (Mathematics), Complexes, Homotopy theory
James D. Stasheff has written: 'H-spaces from a homotopy point of view' -- subject(s): H-spaces, Homotopy theory
Michael Artin has written: 'Etale homotopy' -- subject(s): Homotopy theory 'Algebraic spaces' -- subject(s): Algebraic functions, Algebraic spaces
Rosa Antolini has written: 'Cubical structures and homotopy theory'
G. R. Lindfield has written: 'Modifications of the continuation method for the solution of systems of nonlinear equations'
Akrur Behera has written: 'Homotopy theory in groupoid enriched categories'
Continuation in Spanish is: continuación.