Add to ORKGIn the mid 1970’s Mark Mahowald constructed a new innite family of elements in the 2{component of the stable homotopy groups of spheres, j 2 S2j (S0)(2) [M]. Using standard Adams spectral sequence terminology (which will be recalled in x3 below), j is detected by h1hj 2 Ext2;A (Z=2;Z=2). Thus he had found an in
2§1. My favorite part of the tmf story The spectrum tmf gives a lot of information about the stable ...
Motivic homotopy theory was developed by Morel and Voevodsky in the 1990s. The original motivation f...
We compute the 1-line of stable homotopy groups of motivic spheres over fields of characteristic not...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
We discuss the current state of knowledge of stable homotopy groups of spheres. We describe a new co...
Since the publication of its first edition, this book has served as one of the few available on the ...
The $2$-primary homotopy $\beta$-family, defined as the collection of Mahowald invariants of Mahowal...
Abstract. Let i 2 n+8i−1(Sn) denote an element which sus-pends to a generator of the image of the st...
[[abstract]]We prove the family {h(i)2h3d1} in Ext(A)7,* (Z2, Z2) detects homotopy elements in the 2...
I will give a survey of recent work on the C_2-equivariant stable homotopy groups. Topics to be dis...
In the stable homotopy groups ?q(pn+pm+1)-3(S) of the sphere spectrum S localized at the prime p gre...
AbstractRecently, Bendersky and Thompson introduced a spectral sequence which, for many spaces X, co...
1. Brief introduction to a lengthy subject Determining the stable homotopy groups of spheres has bee...
For the last thirty years the EHP sequence has been a major conceptual tool in the attempt to unders...
2§1. My favorite part of the tmf story The spectrum tmf gives a lot of information about the stable ...
Motivic homotopy theory was developed by Morel and Voevodsky in the 1990s. The original motivation f...
We compute the 1-line of stable homotopy groups of motivic spheres over fields of characteristic not...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
We discuss the current state of knowledge of stable homotopy groups of spheres. We describe a new co...
Since the publication of its first edition, this book has served as one of the few available on the ...
The $2$-primary homotopy $\beta$-family, defined as the collection of Mahowald invariants of Mahowal...
Abstract. Let i 2 n+8i−1(Sn) denote an element which sus-pends to a generator of the image of the st...
[[abstract]]We prove the family {h(i)2h3d1} in Ext(A)7,* (Z2, Z2) detects homotopy elements in the 2...
I will give a survey of recent work on the C_2-equivariant stable homotopy groups. Topics to be dis...
In the stable homotopy groups ?q(pn+pm+1)-3(S) of the sphere spectrum S localized at the prime p gre...
AbstractRecently, Bendersky and Thompson introduced a spectral sequence which, for many spaces X, co...
1. Brief introduction to a lengthy subject Determining the stable homotopy groups of spheres has bee...
For the last thirty years the EHP sequence has been a major conceptual tool in the attempt to unders...
2§1. My favorite part of the tmf story The spectrum tmf gives a lot of information about the stable ...
Motivic homotopy theory was developed by Morel and Voevodsky in the 1990s. The original motivation f...
We compute the 1-line of stable homotopy groups of motivic spheres over fields of characteristic not...