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References
Adams, J.F.: Stable homotopy and generalized homology. Mathematics Lecture Notes. Chicago: University of Chicago 1971
Alexander, J.C.: On mod-p connectedK-theory. Topology10, 337–371 (1971)
Baas, N.A., Madsen, I.: On the realization of certain modules over the Steenrod algebra. Math. Scand.31, 220–224 (1972)
Johnson, D.C., Wilson, S.:BP-operations and Morava's extraordinaryK-theories. Math. Z.144, 55–75 (1975)
Milgram, R.J.: The Steenrod algebra for connectedK-theory. In: Reunion sobre homotopia (Evanston 1974), pp. 127–158. Mexico, D.F.: Soc. Math. Mexicana 1975
Miller, H.R.: On relations between Adams spectral sequences, with an application to the stable homotopy of a Moore space. J. Pure Appl. Algebra20, 287–312 (1981)
Milnor, J.W.: The Steenrod algebra and its dual. Ann. of Math. (2)67, 150–171 (1958)
Morava, J.: ExtraordinaryK-theory-Summary. Preprint
Ravenal, D.C.: The structure ofBP * BP modulo an invariant prime ideal. Topology15, 109–120 (1976)
Robinson, C.A.: A Künneth-theorem for connectedK-theory. J. London Math. Soc. (2)17, 173–181 (1978)
Wilson, W.S.: The Ω-spectrum for Brown-Peterson cohomology Part II. Amer. J. Math.97, 101–123 (1975)
Würgler, U.: On products in a family of cohomology theories associated to the invariant prime ideals of π* BP Comment. Math. Helv.52, 457–481 (1977)
Yagita, N.: On the Steenrod algebra of MoravaK-theory. J. London Math. Soc. (2)22, 423–438 (1980)
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Lellmann, W. Connected MoravaK-theories. Math Z 179, 387–399 (1982). https://doi.org/10.1007/BF01215341
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DOI: https://doi.org/10.1007/BF01215341