| 199940 |
|
Miller G.A., Galanter E., Pribram K.H. |
Plans and the Structure of Behavior |
1970 | •• |
| 39734 |
|
Miller G.A. |
Groups Possessing at Least One Set of Independent Generators Composed of as Many Operators as There are Prime Factors in the Order of the Group |
1915 | •• |
| 41815 |
|
Miller G.A. |
Arithmetization in the History of Mathematics |
1925 | •• |
| 41918 |
|
Miller G.A. |
Note on the Temperature Relations of Photo-Electric Emission and Thermionic Emission of Electrons |
1927 | •• |
| 41989 |
|
Miller G.A. |
Postulates in the History of Science |
1926 | •• |
| 42192 |
|
Miller G.A. |
Transformation of Conjugate Elements or of Conjugate Subgroups |
1928 | •• |
| 42487 |
|
Miller G.A. |
Determination of All the Groups Which Contain a Given Group as an Invariant Subgroup of Prime Index |
1928 | •• |
| 42553 |
|
Miller G.A. |
On the number of cyclic subgroups of a group |
1929 | •• |
| 42616 |
|
Miller G.A. |
Possible α -Automorphisms of Non-Abelian Groups |
1929 | •• |
| 42970 |
|
Miller G.A. |
Automorphisms of Order 2 of an Abelian Group |
1931 | •• |
| 42975 |
|
Miller G.A. |
Automorphism commutators |
1929 | •• |
| 43027 |
|
Miller G.A. |
Group of isomorphism of an Abelian group |
1930 | •• |
| 43028 |
|
Miller G.A. |
Groups generated by two given groups |
1930 | •• |
| 43029 |
|
Miller G.A. |
Groups which admit three-fourths automorphisms |
1929 | •• |
| 43030 |
|
Miller G.A. |
Groups which are decomposable into two non-invariant cyclic subgroups |
1930 | •• |
| 43036 |
|
Miller G.A. |
Groups Involving a Cyclic, a Dicyclic, or a Dihedral Group as an Invariant Subgroup of Prime Index |
1928 | •• |
| 43037 |
|
Miller G.A. |
Groups Which Admit Five-Eighths Automorphisms |
1930 | •• |
| 43038 |
|
Miller G.A. |
Groups Which Admit Five-Eighths Automorphisms |
1929 | •• |
| 43203 |
|
Miller G.A. |
Groups Generated by Two Operators of Order 3 Whose Commutator Is of Order 2 |
1932 | •• |
| 43204 |
|
Miller G.A. |
Groups Involving a Small Number of Conjugates |
1931 | •• |
| 43220 |
|
Miller G.A. |
Inverse Commutator Subgroups |
1931 | •• |
| 43290 |
|
Miller G.A. |
Non-abelian groups of odd prime power order which admit a maximal number of inverse correspondencies in an automorphism |
1929 | •• |
| 43302 |
|
Miller G.A. |
Non-Abelian Groups Admitting More Than Half Inverse Correspondencies |
1930 | •• |
| 43721 |
|
Miller G.A. |
Orders For Which There Exist Exactly Four Or Five Groups |
1932 | •• |
| 43722 |
|
Miller G.A. |
Orders For Which A Given NumberOf Groups Exist |
1932 | •• |
| 43914 |
|
Miller G.A. |
Sets of Distinct Group Operators Involving All the Products but Not All the Squares |
1931 | •• |
| 44072 |
|
Miller G.A. |
Form of the Number of the Subgroups of a Prime Power Group |
1923 | •• |
| 44080 |
|
Miller G.A. |
Group of Isomorphisms of a Transitive Substitution Group |
1921 | •• |
| 44081 |
|
Miller G.A. |
Groups of Order 2m in Which the Number of the Sub-Groups of at Least One Order Is of the Form 1 + 4k |
1923 | •• |
| 44187 |
|
Miller G.A. |
Prime Power Substitution Groups Whose Conjugate Cycles Are Commutative |
1924 | •• |
| 44207 |
|
Miller G.A. |
Sets of Conjugate Cycles of a Substitution Group |
1923 | •• |
| 44385 |
|
Miller G.A. |
The Subgroup of a Group of Finite Order |
1914 | •• |
| 44433 |
|
Miller G.A. |
Upper Limit of the Degree of Transitivity of a Substitution Group |
1915 | •• |
| 44543 |
|
Miller G.A. |
Non-Group Operations |
1932 | •• |
| 44585 |
|
Miller G.A. |
The Commutator Subgroup of a Group Generated by Two Operators |
1932 | •• |
| 44779 |
|
Miller G.A. |
Theorems Relating to the History of Mathematics |
1931 | •• |
| 40639 |
|
Miller G.A. |
Groups Generated by Two Operators, s1, s2, Which Satisfy the Conditions s1m = s2n, (s1s2)k = I, s1s2 = s2s1 |
1919 | •• |
| 40746 |
|
Miller G.A. |
On the Holomorphisms of a Group |
1918 | •• |
| 41147 |
|
Miller G.A. |
An Overlooked Infinite System of Groups of Order pq2 |
1921 | •• |
| 41326 |
|
Miller G.A. |
Felix Klein and the History of Modern Mathematics |
1927 | •• |
| 41330 |
|
Miller G.A. |
Form of the Number of the Prime Power Subgroups of an Abelian Group |
1926 | •• |
| 41347 |
|
Miller G.A. |
Groups Containing a Relatively Small Number of Sylow Subgroups |
1926 | •• |
| 41351 |
|
Miller G.A. |
Groups Generated by Two Operators of Order Three Whose Product Is of Order Six |
1927 | •• |
| 41352 |
|
Miller G.A. |
Groups Generated by Two Operators of Order Three, the Cube of Whose Product is Invariant |
1927 | •• |
| 41354 |
|
Miller G.A. |
Groups Whose Operators Are of the Form sptq |
1927 | •• |
| 41363 |
|
Miller G.A. |
Harmony as a Principle of Mathematical Development |
1928 | •• |
| 41606 |
|
Miller G.A. |
Transitive Groups Involving Direct Products of Lower Degree |
1924 | •• |
| 200045 |
|
Miller G.Y. |
Environmental Science. Working with the Earth |
n/a • | •• |
| 148158 |
|
Miller H., Ravenel D. |
Elliptic cohomology.Geometry, Applications, and Higher Chromatic Analogues. |
2007 | •• |
| 82928 |
|
Miller H.J., Han J. |
Geographic data mining and knowledge discovery |
2009 • | •• |
|
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