- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE JOE HARRIS, MIKE ROTH, AND JASON STARR
- A NOTE ON FANO MANIFOLDS WHOSE SECOND CHERN CHARACTER IS POSITIVE
- HYPERSURFACES OF LOW DEGREE ARE RATIONALLY 1CONNECTED
- THE MAXIMAL FREE RATIONAL QUOTIENT JASON MICHAEL STARR
- THE MAXIMAL FREE RATIONAL QUOTIENT JASON MICHAEL STARR
- CUBIC FOURFOLDS AND SPACES OF RATIONAL CURVES A.J DE JONG AND JASON STARR
- HYPERSURFACES OF LOW DEGREE ARE RATIONALLY SIMPLYCONNECTED
- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES
- LOW DEGREE COMPLETE INTERSECTIONS ARE RATIONALLY SIMPLY CONNECTED
- GLOBAL SECTIONS OF SOME VECTOR BUNDLES ON KONTSEVICH MODULI SPACES
- DIVISORS ON THE SPACE OF MAPS TO GRASSMANNIANS IZZET COSKUN AND JASON STARR
- DIVISOR CLASSES AND THE VIRTUAL CANONICAL BUNDLE FOR GENUS 0 MAPS
- A LOCAL-GLOBAL PRINCIPLE FOR WEAK APPROXIMATION ON VARIETIES OVER FUNCTION FIELDS
- THE AMPLE CONE OF THE KONTSEVICH MODULI SPACE IZZET COSKUN, JOE HARRIS, AND JASON STARR
- FANO VARIETIES AND LINEAR SECTIONS OF HYPERSURFACES
- ARTIN'S AXIOMS, COMPOSITION AND MODULI SPACES JASON STARR
- RATIONAL SURFACES IN INDEX-ONE FANO HYPERSURFACES
- VERY TWISTING FAMILIES OF POINTED LINES ON GRASSMANNIANS
- THE EFFECTIVE CONE OF THE KONTSEVICH MODULI IZZET COSKUN, JOE HARRIS, AND JASON STARR
- A FACT ABOUT LINEAR SPACES ON HYPERSURFACES JASON MICHAEL STARR
- A NOTE ON FANO MANIFOLDS WHOSE SECOND CHERN CHARACTER IS POSITIVE
- DIVISOR CLASSES AND THE VIRTUAL CANONICAL BUNDLE FOR GENUS 0 MAPS
- THE KODAIRA DIMENSION OF SPACES OF RATIONAL CURVES ON LOW DEGREE HYPERSURFACES
- JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE JOE HARRIS, MIKE ROTH, AND JASON STARR
- CURVES OF SMALL DEGREE ON CUBIC THREEFOLDS JOE HARRIS, MIKE ROTH, AND JASON STARR
- EXPLICIT COMPUTATIONS RELATED TO "RATIONAL CONNECTIVITY . . ." BY GRABER, HARRIS, MAZUR AND
- HYPERSURFACES OF LOW DEGREE ARE RATIONALLY 1-CONNECTED
- THE EFFECTIVE CONE OF THE KONTSEVICH MODULI SPACE, PROGRESS REPORT
- HYPERSURFACES OF LOW DEGREE ARE RATIONALLY SIMPLY-CONNECTED
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE II JOE HARRIS AND JASON STARR
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE II JOE HARRIS AND JASON STARR
- A NOTE ON FANO MANIFOLDS WHOSE SECOND CHERN CHARACTER IS POSITIVE
- DIVISOR CLASSES AND THE VIRTUAL CANONICAL BUNDLE FOR GENUS 0 MAPS
- HIGHER FANO MANIFOLDS AND RATIONAL SURFACES A. J. DE JONG AND JASON STARR
- A PENCIL OF ENRIQUES SURFACES OF INDEX ONE WITH JASON MICHAEL STARR
- EXPLICIT COMPUTATIONS RELATED TO \RATIONAL CONNECTIVITY . . ." BY GRABER, HARRIS, MAZUR AND
- VERY TWISTING FAMILIES OF POINTED LINES ON GRASSMANNIANS
- DEGENERATIONS OF RATIONALLY CONNECTED VARIETIES AND PAC FIELDS
- RATIONAL SURFACES IN INDEXONE FANO HYPERSURFACES
- GLOBAL SECTIONS OF SOME VECTOR BUNDLES ON KONTSEVICH MODULI SPACES
- THE KODAIRA DIMENSION OF SPACES OF RATIONAL CURVES ON LOW DEGREE HYPERSURFACES
- A PENCIL OF ENRIQUES SURFACES OF INDEX ONE WITH JASON MICHAEL STARR
- HIGHER FANO MANIFOLDS AND RATIONAL SURFACES A. J. DE JONG AND JASON STARR
- A NOTE ON HURWITZ SCHEMES OF COVERS OF A POSITIVE GENUS CURVE
- A NOTE ON FANO MANIFOLDS WHOSE SECOND CHERN CHARACTER IS POSITIVE
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE II JOE HARRIS AND JASON STARR
- DIVISORS ON THE SPACE OF MAPS TO GRASSMANNIANS IZZET COSKUN AND JASON STARR
- WEAK APPROXIMATION AND REQUIVALENCE OVER FUNCTION FIELDS OF CURVES
- QUOT FUNCTORS FOR DELIGNE-MUMFORD STACKS MARTIN OLSSON AND JASON STARR
- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES TOM GRABER, JOE HARRIS, BARRY MAZUR, AND JASON STARR
- DIVISOR CLASSES AND THE VIRTUAL CANONICAL BUNDLE FOR GENUS 0 MAPS
- THE MAXIMAL FREE RATIONAL QUOTIENT JASON MICHAEL STARR
- A LOCALGLOBAL PRINCIPLE FOR WEAK APPROXIMATION ON VARIETIES OVER FUNCTION FIELDS
- WEAK APPROXIMATION AND R-EQUIVALENCE OVER FUNCTION FIELDS OF CURVES
- THE EFFECTIVE CONE OF THE KONTSEVICH MODULI IZZET COSKUN, JOE HARRIS, AND JASON STARR
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE JOE HARRIS, MIKE ROTH, AND JASON STARR
- ABELJACOBI MAPS ASSOCIATED TO SMOOTH CUBIC THREEFOLDS JOE HARRIS, MIKE ROTH, AND JASON STARR
- CUBIC FOURFOLDS AND SPACES OF RATIONAL CURVES A.J DE JONG AND JASON STARR
- THE MAXIMAL FREE RATIONAL QUOTIENT JASON MICHAEL STARR
- A NOTE ON HURWITZ SCHEMES OF COVERS OF A POSITIVE GENUS CURVE
- A FACT ABOUT LINEAR SPACES ON HYPERSURFACES JASON MICHAEL STARR
- Every rationally connected variety over the function field of a curve has a rational point by A.J. de Jong, MIT and J. Starr, MIT
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE JOE HARRIS, MIKE ROTH, AND JASON STARR
- JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- DEGENERATIONS OF RATIONALLY CONNECTED VARIETIES AND PAC FIELDS
- ABEL-JACOBI MAPS ASSOCIATED TO SMOOTH CUBIC THREEFOLDS JOE HARRIS, MIKE ROTH, AND JASON STARR
- CURVES OF SMALL DEGREE ON CUBIC THREEFOLDS JOE HARRIS, MIKE ROTH, AND JASON STARR
- VERY TWISTING FAMILIES OF POINTED LINES ON GRASSMANNIANS
- A NOTE ON HURWITZ SCHEMES OF COVERS OF A POSITIVE GENUS CURVE
- THE MAXIMAL FREE RATIONAL QUOTIENT JASON MICHAEL STARR
- THE AMPLE CONE OF THE KONTSEVICH MODULI SPACE IZZET COSKUN, JOE HARRIS, AND JASON STARR
- RESTRICTION OF SECTIONS FOR FAMILIES OF ABELIAN VARIETIES
- FANO VARIETIES AND LINEAR SECTIONS OF HYPERSURFACES
- ARTIN'S AXIOMS, COMPOSITION AND MODULI SPACES JASON STARR
- VERY TWISTING FAMILIES OF POINTED LINES ON GRASSMANNIANS
- Every rationally connected variety over the function eld of a curve has a rational point by A.J. de Jong, MIT and J. Starr, MIT
- RESTRICTION OF SECTIONS FOR FAMILIES OF ABELIAN TOM GRABER AND JASON MICHAEL STARR
- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES
- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES
- CURVES OF SMALL DEGREE ON CUBIC THREEFOLDS JOE HARRIS, MIKE ROTH, AND JASON STARR
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE II JOE HARRIS AND JASON STARR
- ARTIN'S AXIOMS, COMPOSITION AND MODULI SPACES JASON STARR
- RATIONAL SURFACES IN INDEX-ONE FANO HYPERSURFACES
- A NOTE ON FANO MANIFOLDS WHOSE SECOND CHERN CHARACTER IS POSITIVE
- A FACT ABOUT LINEAR SPACES ON HYPERSURFACES JASON MICHAEL STARR
- QUOT FUNCTORS FOR DELIGNE-MUMFORD STACKS MARTIN OLSSON AND JASON STARR
- A PENCIL OF ENRIQUES SURFACES OF INDEX ONE WITH NO SECTION
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE JOE HARRIS, MIKE ROTH, AND JASON STARR
- WEAK APPROXIMATION AND R-EQUIVALENCE OVER FUNCTION FIELDS OF CURVES
- THE EFFECTIVE CONE OF THE KONTSEVICH MODULI SPACE, PROGRESS REPORT
- QUOT FUNCTORS FOR DELIGNE-MUMFORD STACKS MARTIN OLSSON AND JASON STARR
- THE AMPLE CONE OF THE KONTSEVICH MODULI SPACE IZZET COSKUN, JOE HARRIS, AND JASON STARR
- VERY TWISTING FAMILIES OF POINTED LINES ON GRASSMANNIANS
- A PENCIL OF ENRIQUES SURFACES OF INDEX ONE WITH JASON MICHAEL STARR
- A PENCIL OF ENRIQUES SURFACES OF INDEX ONE WITH JASON MICHAEL STARR
- HIGHER FANO MANIFOLDS AND RATIONAL SURFACES A. J. DE JONG AND JASON STARR
- DIVISORS ON THE SPACE OF MAPS TO GRASSMANNIANS IZZET COSKUN AND JASON STARR
- GLOBAL SECTIONS OF SOME VECTOR BUNDLES ON KONTSEVICH MODULI SPACES
- THE KODAIRA DIMENSION OF SPACES OF RATIONAL CURVES ON LOW DEGREE HYPERSURFACES
- FANO VARIETIES AND LINEAR SECTIONS OF HYPERSURFACES
- DIVISOR CLASSES AND THE VIRTUAL CANONICAL BUNDLE FOR GENUS 0 MAPS
- A LOCAL-GLOBAL PRINCIPLE FOR WEAK APPROXIMATION ON VARIETIES OVER FUNCTION FIELDS
- RATIONAL CONNECTIVITY AND SECTIONS OF FAMILIES OVER CURVES
- JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- HYPERSURFACES OF LOW DEGREE ARE RATIONALLY SIMPLY-CONNECTED
- DEGENERATIONS OF RATIONALLY CONNECTED VARIETIES AND PAC FIELDS
- THE EFFECTIVE CONE OF THE KONTSEVICH MODULI SPACE
- RATIONAL CURVES ON HYPERSURFACES OF LOW DEGREE II JOE HARRIS AND JASON STARR
- CUBIC FOURFOLDS AND SPACES OF RATIONAL CURVES A.J DE JONG AND JASON STARR
- Every rationally connected variety over the function field of a curve has a r* *ational point
- RESTRICTION OF SECTIONS FOR FAMILIES OF ABELIAN TOM GRABER AND JASON MICHAEL STARR
